MathgeomGLS

1
-1.02093322246034E-7	-1085947873570.14	3.20453043877962E-6	32276334238026.1	-1.02093322246034E-7	-1085947873570.14	3.20453043877962E-6	32276334238026.1	0.25	Verdana		12	2	6	7	60	70	1	1	2	1	1	64000	1	15793151	12632256	255	32768	8421504	32896	32896	8421376	15780518	128	0	0	2	4
2
1.191043E-16/(x^5*(exp(1.438777E-2/(3000*x))-1))	1.191043E-16/(x^5(exp(1.438777E-2/(3000x)) -1))	0.00100000004749745	2	8388863	0.100000001490116	1E-8	3E-6	1.79989163600958E-6	5995416919966.33	0	-1	-1	0	-1
3
1.191043E-16/(x^5*(exp(1.438777E-2/(4000*x))-1))	1.191043E-16/(x^5(exp(1.438777E-2/(4000x)) -1))	0.00100000004749745	2	32768	0.100000001490116	1E-8	3E-6	1.79989163600958E-6	6966580994075.14	0	-1	-1	0	-1
4
1.191043E-16/(x^5*(exp(1.438777E-2/(5000*x))-1))	1.191043E-16/(x^5(exp(1.438777E-2/(5000x)) -1))	0.00100000004749745	2	16711680	0.100000001490116	1E-8	3E-6	1.79776373440044E-6	7937745068183.95	0	-1	-1	0	-1
5
1.191043E-16/(x^5*(exp(1.438777E-2/(6000*x))-1))	1.191043E-16/(x^5(exp(1.438777E-2/(6000x)) -1))	0.00100000004749745	2	33023	0.100000001490116	1E-8	3E-6	1.79776373440044E-6	8993358192215.26	0	-1	-1	0	-1
6
2
7
Visible min	1	-1	0	1	16711808	3	16711808	-1	0	-1	5	2	-1
8
3.9E-7	0	3.9E-7	32000000000000	
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Visible max	1	-1	0	1	255	3	255	-1	0	-1	5	2	-1
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7E-7	32000000000000	7E-7	0	
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17
12
Info	7.5E-7	31000000000000	20	Tahoma		12	8388736	-1
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8
14
Black-body radiation is the type of electromagnetic radiation of a body in thermodynamic equilibrium	8388736
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with its environment.	8388736
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An opaque and non-reflective body held at constant, uniform temperature will emit radiation over a	8388736
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range of wavelengths as depicted by these graphs.	8388736
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A black-body at room temperature appears black, as most of the energy it radiates is infra-red and	8388736
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cannot be perceived by the human eye.	8388736
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At higher temperatures, black bodies glow with increasing intensity and colors that range from dull red	8388736
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to blindingly brilliant blue-white as the temperature increases.	8388736
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Planck	7.5E-7	25000000000000	20	Tahoma		12	8421376	-1
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3
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Planck's law describes the electromagnetic radiation emitted by a black-body.	8421376
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Max Planck proposed this law in 1900.	8421376
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Here it has the form...	8421376
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Formula	1.169E-6	22700000000000	13	Tahoma		9	16711680	-1
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14
29
   2	16711680
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	16711680
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5	16711680
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	16711680
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	16711680
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	16711680
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	16711680
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	16711680
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                                                           -34	16711680
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	16711680
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	16711680
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	16711680
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	16711680
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                                                               -23	16711680
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Formula	1.138E-6	22600000000000	20	Tahoma		12	16711680	-1
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1
45
2hc        1	16711680
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Formula	1E-6	22200000000000	20	Tahoma		12	16711680	-1
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1
48
B   =  -------  ---------	16711680
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Formula	1.15E-6	21700000000000	23	Symbol		14	16711680	-1
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6
51
l        --	16711680
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	16711680
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	16711680
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	16711680
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	16711680
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l	16711680
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Formula	1.242E-6	21380000000000	20	Tahoma		12	16711680	-1
58
1
59
e       -1	16711680
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Formula	1.025E-6	22000000000000	23	Symbol		11	16711680	-1
61
4
62
l	16711680
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                       l	16711680
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	16711680
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              l	16711680
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Formula	1.27E-6	21800000000000	18	Tahoma		11	16711680	-1
67
2
68
 hc	16711680
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  kT	16711680
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Meaning	1E-6	19800000000000	21	Tahoma		11	16711680	-1
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6
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Where    B  = spectral radiance {The SI unit of radiance is watts per steradian per square metre}.	16711680
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            h  = Planck constant =  6.62606957x10     Joule seconds.	16711680
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            c  = velocity of light  = 299,792,458 metres per seconds.	16711680
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                = wavelength {metres} of emmitted light.	16711680
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            k   = Boltzmann constant = 1.3806488x10     Joules per degree Kelvin.	16711680
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            T  = temperature {degrees Kelvin, 0�C = 273.15 K}.	16711680
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6000k	4.4E-7	29000000000000	20	Tahoma		12	16711680	-1
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1
80
6000 K	33023
81
5000k	5.2E-7	12000000000000	20	Tahoma		12	16711680	-1
82
1
83
5000 K	16711680
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4000k	6.4E-7	4000000000000	20	Tahoma		12	16711680	-1
85
1
86
4000 K	32768
87
3000k	8.8E-7	1700000000000	20	Tahoma		12	16711680	-1
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1
89
3000 K	8388863
90
x axis	1.08E-6	-100000000000	20	Tahoma		12	16711680	-1
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1
92
Wave length (metres)	255
93
y axis	-5E-8	24000000000000	17	Tahoma		12	16711680	-1
94
8
95
R	32768
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a	32768
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d	32768
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i	32768
99
a	32768
100
n	32768
101
c	32768
102
e	32768
103
Visible	7E-8	24000000000000	20	Tahoma		12	128	-1
104
16
105
                                 Visible	128
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                             wave lengths	128
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                         <----------------->	128
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	128
109
	128
110
	128
111
	128
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 Ultra-violet	128
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wave lengths	128
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	128
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	128
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	128
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	128
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	128
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                                                                         Infra-red	128
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                                                                      wave lengths	128
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